Erstellt von cameronfdowner
vor etwa 9 Jahre
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A \(\cdot\)1 =
A \(\cdot\)0 =
A + 1 =
A + 0 =
Zero and Unit Rules.
A \(\cdot\) \(\bar A\) =
A + \(\bar A\) =
\(\overline {(\bar A)} \) =
Complement Relations
A \(\cdot\) A =
A + A =
Idempotence
A \(\cdot\) B =
A + B =
Commutative Laws
A + (A \(\cdot\) B) =
A \(\cdot\) (A + B) =
A + (\(\bar A\) \(\cdot\) B) =
Absorption Laws
A \(\cdot\) (B + C) =
A + (B \(\cdot\) C) =
Distributive Laws
A + B + C =
A \(\cdot\) B \(\cdot\) C =
Associative Laws
\(\overline {A + B + C} \) =
\(\overline {A \cdot\ B \cdot\ C} \) =
De Morgan's Theorem